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173 results on '"Gordon, Daniel M."'

1. Signed Difference Sets

Author

Gordon, Daniel M.

Subjects
Mathematics - Combinatorics, 05B10
Abstract

A $(v,k,\lambda)$ difference set in a group $G$ of order $v$ is a subset $\{d_1, d_2, \ldots,d_k\}$ of $G$ such that $D=\sum d_i$ in the group ring $\mathbb{Z}[G]$ satisfies $$D D^{-1} = n + \lambda G,$$ where $n=k-\lambda$. If $D=\sum s_i d_i$, where the $s_i \in \{ \pm 1\}$, satisfies the same equation, we will call it a signed difference set. This generalizes both difference sets (all $s_i=1$) and circulant weighing matrices ($G$ cyclic and $\lambda=0$). We will show that there are other cases of interest, and give some results on their existence., Comment: To appear in Designs, Codes and Cryptography

Published
2022

3. On difference sets with small $\lambda$

Author

Gordon, Daniel M.

Subjects
Mathematics - Combinatorics, 05B10
Abstract

In a 1989 paper \cite{arasu2}, Arasu used an observation about multipliers to show that no $(352,27,2)$ difference set exists in any abelian group. The proof is quite short and required no computer assistance. We show that it may be applied to a wide range of parameters $(v,k,\lambda)$, particularly for small values of $\lambda$. With it a computer search was able to show that the Prime Power Conjecture is true up to order $2 \cdot 10^{10}$, extend Hughes and Dickey's computations for $\lambda=2$ and $k \leq 5000$ up to $10^{10}$, and show nonexistence for many other parameters., Comment: 8 pages

Published
2020

4. New Nonexistence Results on Circulant Weighing Matrices

Author

Arasu, K. T., Gordon, Daniel M., and Zhang, Yiran

Subjects
Mathematics - Combinatorics, 05B20 (Primary), 05B10 (Secondary)
Abstract

A circulant weighing matrix $W = (w_{i,j})$ is a square matrix of order $n$ and entries $w_{i,j}$ in $\{0, \pm 1\}$ such that $WW^T=kI_n$. In his thesis, Strassler gave a table of existence results for such matrices with $n \leq 200$ and $k \leq 100$. In the latest version of Strassler's table given by Tan \cite{arXiv:1610.01914} there are 34 open cases remaining. In this paper we give nonexistence proofs for 12 of these cases, report on preliminary searches outside Strassler's table, and characterize the known proper circulant weighing matrices., Comment: 15 pages

Published
2019

7. On the Density of the Set of Known Hadamard Orders

Author

de Launey, Warwick and Gordon, Daniel M.

Subjects
Mathematics - Combinatorics, Mathematics - Number Theory, 05B20, 11N25, 11B05
Abstract

Let $S(x)$ be the number of $n \leq x$ for which a Hadamard matrix of order $n$ exists. Hadamard's conjecture states that $S(x)$ is about $x/4$. From Paley's constructions of Hadamard matrices, we have that \[ S(x) = \Omega(x/\log x). \] In a recent paper, the first author suggested that counting the products of orders of Paley matrices would result in a greater density. In this paper we use results of Kevin Ford to show that it does: \begin{equation}\label{eq:abs} S(x) \geq x/\log x \exp((C+o(1))(\log \log \log x)^2)\,, \nonumber \end{equation} where $C=0.8178...$. This bound is surprisingly hard to improve upon. We show that taking into account all the other major known construction methods for Hadamard matrices does not shift the bound. Our arguments use the notion of a (multiplicative) monoid of natural numbers. We prove some initial results concerning these objects. Our techniques may be useful when assessing the status of other existence questions in design theory., Comment: Accepted for publication in a special issue of the journal "Cryptography and Communications: Discrete Structures, Boolean Functions and Sequences" which will contain the Proceedings of the International Conference on Design Theory and Applications which was held at the National University of Ireland, Galway in the period July 1-3, 2009.

Published
2010

8. Optimal hash functions for approximate closest pairs on the n-cube

Author

Gordon, Daniel M., Miller, Victor, and Ostapenko, Peter

Subjects
Computer Science - Information Theory
Abstract

One way to find closest pairs in large datasets is to use hash functions. In recent years locality-sensitive hash functions for various metrics have been given: projecting an n-cube onto k bits is simple hash function that performs well. In this paper we investigate alternatives to projection. For various parameters hash functions given by complete decoding algorithms for codes work better, and asymptotically random codes perform better than projection., Comment: IEEE Transactions on Information Theory, to appear

Published
2008

9. Perfect single error-correcting codes in the Johnson Scheme

Author

Gordon, Daniel M.

Subjects
Mathematics - Combinatorics, 94B25
Abstract

Delsarte conjectured in 1973 that there are no nontrivial pefect codes in the Johnson scheme. Etzion and Schwartz recently showed that perfect codes must be k-regular for large k, and used this to show that there are no perfect codes correcting single errors in J(n,w) for n <= 50000. In this paper we show that there are no perfect single error-correcting codes for n <= 2^250., Comment: 4 pages, revised, accepted for publication in IEEE Transactions on Information Theory

Published
2005
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10. On the existence of cyclic difference sets with small parameters

Author

Baumert, Leonard D. and Gordon, Daniel M.

Subjects
Mathematics - Combinatorics, 05B10
Abstract

Previous surveys by Baumert and Lopez and Sanchez have resolved the existence of cyclic (v,k,lambda) difference sets with k <= 150, except for six open cases. In this paper we show that four of those difference sets do not exist. We also look at the existence of difference sets with k <= 300 and cyclic Hadamard difference sets with v <= 10,000. Finally, we extend an earlier search of the second author to show that no cyclic projective planes exist with non-prime power orders up to two billion., Comment: 8 pages. To appear, Proceedings of Fields Institute conference in number theory in honor of Hugh Williams

Published
2003

16. Dense admissible sets

Author

Gordon, Daniel M., Rodemich, Gene, Goos, Gerhard, editor, Hartmanis, Juris, editor, van Leeuwen, Jan, editor, and Buhler, Joe P., editor

Published
1998
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33. Phase 2a trial of 0, 1, and 3 month and 0, 7, and 28 day immunization schedules of malaria vaccine RTS,S/AS02 in malaria-naïve adults at the Walter Reed Army Institute of Research

Author

Kester, Kent E., Cummings, James F., Ockenhouse, Christian F., Nielsen, Robin, Hall, B. Ted, Gordon, Daniel M., Schwenk, Robert J., Krzych, Urszula, Holland, Carolyn A., Richmond, Gregory, Dowler, Megan G., Williams, Jackie, Wirtz, Robert A., Tornieporth, Nadia, Vigneron, Laurence, Delchambre, Martine, Demoitie, Marie-Ange, Ballou, W. Ripley, Cohen, Joe, and Heppner, D. Gray, Jr.

Published
2008
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43. Perfect single error-correcting codes in the Johnson scheme

Author

Gordon, Daniel M.

Subjects
Error-correcting codes -- Analysis, Coding theory -- Analysis
Abstract

Delsarte conjectured in 1973 that there are no nontrivial pefect codes in the Johnson scheme. Etzion and Schwartz recently showed that perfect codes must be k-regular for large k, and used this to show that there are no perfect codes correcting single errors in J(n, w) for n [less than or equal to] 50 0000. In this correspondence we show that there are no perfect single error-correcting codes for n [less than or equal to] [2.sup.250]. Index Terms--Constant-weight codes, Johnson scheme, perfect codes.

Published
2006

46. A Remark on Plotkin's Bound

Author

de Launey, Warwick and Gordon, Daniel M.

Subjects
Binary-coded notation -- Measurement, Information theory -- Innovations, Coding theory -- Innovations
Abstract

Let A(n, d) denote the greatest number of codewords possible in a binary block code of length n and distance d. Plotkin gave a simple counting argument which leads to an upper bound B(n, d) for A(n, d) when d [is greater than or equal to] n/2. Levenshtein proved that if Hadamard's conjecture is true then Plotkin's bound is sharp. Though Hadamard's conjecture is probably true, its resolution remains a difficult open question. So it is natural to ask what one can prove about the ratio R(n, d) = A(n, d)/B(n, d). This note presents an efficient heuristic for constructing, for any d [is greater than or equal to] n/2, a binary code which has at least 0.495 B(n, d) codewords. A computer calculation confirms that R(n, d) [is greater than] 0.495 for d up to one trillion. Index Terms--Goldbach conjecture, Hadamard matrix, high-distance binary block codes, Paley matrix, Plotkin bound.

Published
2001

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